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SUBSUMS - Subset Sums |
Given a sequence of N (1 ≤ N ≤ 34) numbers S1, ..., SN (-20,000,000 ≤ Si ≤ 20,000,000), determine how many subsets of S (including the empty one) have a sum between A and B (-500,000,000 ≤ A ≤ B ≤ 500,000,000), inclusive.
Input
The first line of standard input contains the three integers N, A, and B. The following N lines contain S1 through SN, in order.
Output
Print a single integer to standard output representing the number of subsets satisfying the above property. Note that the answer may overflow a 32-bit integer.
Example
Input: 3 -1 2 1 -2 3 Output: 5
The following 5 subsets have a sum between -1 and 2:
- 0 = 0 (the empty subset)
- 1 = 1
- 1 + (-2) = -1
- -2 + 3 = 1
- 1 + (-2) + 3 = 2
Added by: | Neal Wu |
Date: | 2009-01-19 |
Time limit: | 1s |
Source limit: | 50000B |
Memory limit: | 1536MB |
Cluster: | Cube (Intel G860) |
Languages: | All except: ERL JS-RHINO |
hide comments
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2019-04-02 05:52:05
Nice problem! AC in one go! Binary Search Tree required! |
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2019-01-24 08:18:45
hay |
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2018-01-22 00:50:58
Be careful with the overflow ;) |
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2017-09-17 08:31:54
learnt alot !! after 2WA and 4TLE finally AC!! |
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2017-09-14 08:58:41
Meet in the middle.. |
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2017-07-18 12:48:32
Can anyone please tell me what are some corner test cases ?.Because I am getting wrong Answer. |
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2017-06-29 18:13:58
Meet in the middle :) |
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2017-06-22 11:02:01
Empty subset should either be considered or not considered in the final value. Its value being 0 seems a little wrong. Cost me 2 WA :) Last edit: 2017-06-22 11:23:48 |
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2017-06-21 15:33:03
Nice problem!! Take care whether the empty subset sum lies in the range [a,b] or not. Also STL made it a lot easier!! |
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2017-06-19 17:36:09
ac finally :) it took my whole day to learn bitmask and meet in the middle approach :) worth giving the time . must do |